Affine Algebraic Groups, Motives and Cohomological Invariants

Videos from BIRS Workshop 18w5021

, University of Nottingham
- 09:46
The notion of anisotropy taken to the limit
, LMU Munich
- 10:49
Involutions and the algebraic cobordism ring
, Université Paris 6
- 11:51
Lifting Witt vector bundles
, Université Claude Bernard Lyon 1
- 16:46
Semi-simple groups that are quasi-split over a tamely-ramified extension
, Michigan State University
- 17:43
Algebraic groups with good reduction and unramified cohomology
, Yale University
- 09:50
Isotropy of quadratic forms over function fields
, TU Dortmund
- 10:50
The quadratic Zariski problem over global fields
, Emory University
- 11:55
The degree three cohomology group of function field of curves over number fields
, University of South Carolina
- 15:50
Exceptional collections on arithmetic toric varieties
, Bar-Ilan University
- 16:48
Bracket width of simple Lie algebras
, University of Ottawa
- 17:47
Twisted quadratic foldings of root systems
, Steklov Mathematical Institute, Russian Academy of Sciences
- 09:50
Affine algebraic groups and Cremona groups
, St. Petersburg State University
- 10:50
Simple algebraic groups and structurable algebras
, University of Western Ontario
- 11:50
Schubert cycles and subvarieties of twisted projective homogeneous varieties
, Ecole Polytechnique Federale de Lausanne
- 09:44
Lines on cubic surfaces and Witt invariants
, Université Paris 13
- 10:50
Mixed Witt rings and cohomological invariants of algebras with involutions
, Universityof Alberta
- 11:51
Multiplicity-free products of Schubert divisors
, Universität München
- 15:46
Hasse principle for Rost motives
, St. Petersburg State University
- 16:42
Symmetric space of type EIII as a Grassmannian for Brown algebra
, Lancaster University
- 17:47
Automorphism groups of triple systems and their generic subsystems
The norm principle for type D$_n$ groups over complete discretely valued fields
Purity for hermitian Witt groups of Azumaya algebras over regular local rings of dimension $\leq 2$